A raindrop of mass 1 g falling from a he...

A raindrop of mass 1 g falling from a height of 1 km hits the ground with a speed of `50 m s^(-1)`. If the resistive force is proportional to the speed of the drop, then the work done by the resistive force is (Take `g = 10 m s^(-2)`)

Similar Questions

Explore conceptually related problems

A raindrop of mass 1g falling from a height of 1km hits is the ground with a speed of 50 ms^(-1) If the resistence force is properition to the speed of the drop .then the work done by the resistence force is ("Taking" g: 10ms^(-2)) .

A raindrop of mass 1.00 g falling form a height of 1 km hits the ground with a speed of 50 ms^-1 . Calculate. the loss of P.E. of the drop.

A rain drop of mass 1.00 g falling from a height of 1 km hits the ground with a speed of 50 ms^-1 . Calculate. the gain in K.E. of the drop.

A drop of mass 2.0 g falls from a cliff of height 1.0 km It hits the ground with a speed of 50.0 ms^(-1). The work done by the resistive force is

A stone of mass 20 g falling from height of 2 km hits the ground with a speed of 200 ms^-1 . The work done by the gravitational force is

A drop of mass 1.00 g falling from a height 1.00 km . It hits the ground with a speed of 50.0 ms^(-1) . What is the work by the unknown resistive force ?

A rain drop of mass 1.00 g falling from a height of 1 km hits the ground with a speed of 50 ms^-1 . Calculate. Is the gain in K.E. equal to loss of P.E.? If not, why?

A raindrop of mass 2g falling from a height of 1.00 km, hits the ground with a speed of 40.0 ms^(-1). (a) Find the work done by the grativational force. (b) Find the work done by the opposing resistive force (g=10ms^(-2))

A raindrop of mass 1 g falling from a height of 1 km hits the ground with a speed of `50 m s^(-1)`. If the resistive force is proportional to the speed of the drop, then the work done by the resistive force is (Take `g = 10 m s^(-2)`)

Similar Questions

Recommended Questions